Longtime dynamics of solutions for higher-order ( m 1 , m 2 ) $(m_{1},m_{2})$ -coupled Kirchhoff models with higher-order rotational inertia and nonlocal damping

Abstract

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Abstract The Kirchhoff model is derived from the vibration problem of stretchable strings. This paper focuses on the longtime dynamics of a higher-order ( m 1 , m 2 ) $(m_{1},m_{2})$ -coupled Kirchhoff system with higher-order rotational inertia and nonlocal damping. We first obtain the state of the model’s solutions in different spaces through prior estimation. After that, we immediately prove the existence and uniqueness of their solutions in different spaces through the Faedo-Galerkin method. Subsequently, we prove their family of global attractors using the compactness theorem. Finally, we reflect on the subsequent research of the model and point out relevant directions for further research on the model. In this way, we systematically study the longtime dynamics of the higher-order ( m 1 , m 2 ) $(m_{1},m_{2})$ -coupled Kirchhoff model with higher-order rotational inertia, thus enriching the relevant findings of higher-order coupled Kirchhoff models and laying a theoretical foundation for future practical applications.

Keywords

• Higher-order ( m 1 , m 2 ) $(m_{1},m_{2})$ -coupled Kirchhoff system
• Higher-order rotational inertia
• Family of global attractors